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Displaying 41 – 59 of 59

Analytic continuation of functions difined by means of continued fraction.

W.J. Thron, Haakon Waadeland (1980)

Mathematica Scandinavica

Application of differential equations for transforming the implicit functions into the explicit ones

K. Orlov (1977)

Matematički Vesnik

Applications arithmétiques de l'étude des valeurs aux entiers négatifs des séries de Dirichlet associées à un polynôme

Philippe Cassou-Noguès (1981)

Annales de l'institut Fourier

Nous étudions les fonctions $p$ -adiques associées à des séries du type $Z (P, Q, ξ) (s) = \sum_{n \in N^{r}} Q (n) ξ^{n} P (n)^{- s}$ dans certains cas, où elles admettent un prolongement méromorphe à $C$ avec un nombre fini de pôles et des valeurs aux entiers négatifs algébriques. On retrouve comme cas particulier les fonctions $L$ $p$ -adiques des corps totalement réels et les fonctions $Γ$ -multiples $p$ -adiques.

Applications of a special representation of analytic functions.

Argyros, I.K., Mahrt, L.F., Szidarovszky, F. (1997)

Southwest Journal of Pure and Applied Mathematics [electronic only]

Approximants de Padé-Hermite. 1ère partie: théorie.

J. Della Dora, C. Di Crescenzo (1984)

Numerische Mathematik

Approximants de Padé-Hermite. 2ème partie: programmation.

J. Della Dora, C. Di Crescenzo (1984)

Numerische Mathematik

Approximation of entire functions of slow growth.

Ganti, Ramesh, Srivastava, G.S. (2006)

General Mathematics

Approximation of entire functions of slow growth on compact sets

G. S. Srivastava, Susheel Kumar (2009)

Archivum Mathematicum

In the present paper, we study the polynomial approximation of entire functions of several complex variables. The characterizations of generalized order and generalized type of entire functions of slow growth have been obtained in terms of approximation and interpolation errors.

Approximation of entire functions of two complex variables in Banach spaces.

Ganti, Ramesh, Srivastava, G.S. (2006)

JIPAM. Journal of Inequalities in Pure & Applied Mathematics [electronic only]

Approximation par des fonctions holomorphes à croissance contrôlée.

Philippe Charpentier, Yves Dupain, Modi Mounkaila (1994)

Publicacions Matemàtiques

Let Ω be a bounded pseudo-convex domain in Cn with a C∞ boundary, and let S be the set of strictly pseudo-convex points of ∂Ω. In this paper, we study the asymptotic behaviour of holomorphic functions along normals arising from points of S. We extend results obtained by M. Ortel and W. Schneider in the unit disc and those of A. Iordan and Y. Dupain in the unit ball of Cn. We establish the existence of holomorphic functions of given growth having a "prescribed behaviour" in almost all normals arising...

Areas of Projections of Analytic Sets.

H. Alexander, B.A. Taylor, J. Ullmann (1972)

Inventiones mathematicae

Arithmetic mean function of the real part of entire Dirichlet series I

J. S. Gupta, Shakti Bala (1975)

Annales Polonici Mathematici

Arithmetic operations with regular C-fractions.

Lisa Lorentzen (1992)

Numerische Mathematik

Arithmetical properties of finite rings and algebras, and analytical number theory. V. Categories and relative analytic number theory.

John Knopfmacher (1974)

Journal für die reine und angewandte Mathematik

Asymptotic estimates for some number-theoretic power series

Stefan Gerhold (2010)

Acta Arithmetica

Asymptotic expansions of quasiperiodic solutions

L. Chierchia, E. Zehnder (1989)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

Asymptotic FitzGerald inequalities.

Daoud Bshouty, Walter Hengartner (1978)

Commentarii mathematici Helvetici

Asymptotic stability for sets of polynomials

Thomas W. Müller, Jan-Christoph Schlage-Puchta (2005)

Archivum Mathematicum

We introduce the concept of asymptotic stability for a set of complex functions analytic around the origin, implicitly contained in an earlier paper of the first mentioned author (“Finite group actions and asymptotic expansion of $e^{P (z)}$ ", Combinatorica 17 (1997), 523 – 554). As a consequence of our main result we find that the collection of entire functions $exp (𝔓)$ with $𝔓$ the set of all real polynomials $P (z)$ satisfying Hayman’s condition $[z^{n}] exp (P (z)) > 0 (n \geq n_{0})$ is asymptotically stable. This answers a question raised in loc. cit.

Attractive Fixed Points and Continued Fractions.

John Gill (1973)

Mathematica Scandinavica

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